Bollobás, Three-graphs without two triples whose symmetric difference is contained in a third,Discrete Mathematics,8(1974), 21-24

· 1974

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Anti-Ramsey numbers for cancellative configurations in p-graphs

math.CO · 2026-04-23 · unverdicted · novelty 6.0

Anti-Ramsey numbers for cancellative configurations in p-graphs are at most 1 + floor(n/p), with improved bounds ar(n, F4) between roughly 4n²/21 and (5n²-8n)/21.

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Anti-Ramsey numbers for cancellative configurations in p-graphs math.CO · 2026-04-23 · unverdicted · none · ref 2
Anti-Ramsey numbers for cancellative configurations in p-graphs are at most 1 + floor(n/p), with improved bounds ar(n, F4) between roughly 4n²/21 and (5n²-8n)/21.

Bollobás, Three-graphs without two triples whose symmetric difference is contained in a third,Discrete Mathematics,8(1974), 21-24

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